The iteration step in order to solve for the cube roots of a given number $$'N'$$ using the Newton-Raphson's method is

While numerically solving the differential equation $$\,{{dy} \over {dx}} + 2x{y^2} = 0,y\left( 0 \right) = 1\,\,$$ using Euler's predictor corrector...

It is known that two roots of the non-linear equation $$\,{x^3} - 6{x^2} + 11x - 6 = 0\,\,$$ are $$1$$ and $$3.$$ The third root will be

Identity the Newton $$-$$ Raphson iteration scheme for the finding the square root of $$2$$

The polynomial $$\,p\left( x \right) = {x^5} + x + 2\,\,$$ has